On a new problem about the local irregularity of graphs

We say that a graph or a multigraph is locally irregular if adjacent vertices have different degrees. The locally irregular edge coloring is an edge coloring of a (multi) graph G such that every color induces a locally irregular sub (multi) graph of G. We denote by lir (G) the locally irregular chromatic index of G, which is the smallest number of colors required in a locally irregular edge coloring of G if such a coloring exists. We state the following new problem. Let G be a connected graph that is not isomorphic to K₂ or K₃. What is the minimum number of edges of G whose doubling yields a multigraph which is locally irregular edge colorable using at most two colors with no multiedges colored with two colors? This problem is closely related to the Local Irregularity Conjecture for graphs, (2, 2) -Conjecture, Local Irregularity Conjecture for 2-multigraphs and other similar concepts concerning edge colorings. We solve this problem for graph classes like paths, cycles, trees, complete graphs, complete k-partite graphs, split graphs and powers of cycles. Our solution of this problem for complete k-partite graphs (k>1) and powers of cycles which are not complete graphs shows that the locally irregular chromatic index is equal to two for these graph classes. We also consider this problem for some special families of cacti and prove that the minimum number of edges in a graph whose doubling yields a multigraph which has such coloring does not have a constant upper bound not only for locally irregular uncolorable cacti.